Journal of Algebraic Combinatorics (EMIS Electronic Version)

Home > Vol 31, No 2 (2010)

An algorithmic Littlewood-Richardson rule

Ricky Ini Liu

DOI: 10.1007/s10801-009-0184-1

Abstract

We introduce a Littlewood-Richardson rule based on an algorithmic deformation of skew Young diagrams and present a bijection with the classical rule. The result is a direct combinatorial interpretation and proof of the geometric rule presented by Coskun ( 2000). We also present a corollary regarding the Specht modules of the intermediate diagrams.

Pages: 253–266

Keywords: keywords Littlewood-Richardson rule; Specht modules; Grassmannian

Full Text: PDF

References

1. Coskun, I.: A Littlewood-Richardson rule for two-step flag varieties. Invent. Math. 176(2), 325-395 (2009)
2. James, G.D.: A characteristic-free approach to the representation theory of Sn. J. Algebra 46(2), 430- 450 (1977)
3. Knutson, A., Tao, T.: Puzzles and (equivariant) cohomology of Grassmannians. Duke Math. J. 119(2), 221-260 (2003)
4. Peel, M.H., James, G.D.: Specht series for skew representations of symmetric groups. J. Algebra 56(2), 343-364 (1979)
5. Reiner, V., Shimozono, M.: Percentage-avoiding, northwest shapes and peelable tableaux. J. Combin. Theory Ser. A 82(1), 1-73 (1998)
6. Sagan, B.E.: The Symmetric Group: Representations, Combinatorial Algorithms, and Symmetric Functions, 2nd edn. Graduate Texts in Mathematics, vol.
203. Springer, New York (2001)
7. Stanley, R.P.: Enumerative Combinatorics, vol.
2. Cambridge Studies in Advanced Mathematics, vol.
62. Cambridge University Press, Cambridge (1999). With a foreword by Gian-Carlo Rota and

	EMIS Electronic Library of Mathematics (ELibM) The Open Access Repository of Mathematics
	JOURNAL OF ALGEBRAIC COMBINATORICS
	Editors-in-chief: C. A. Athanasiadis, T. Lam, A. Munemasa, H. Van Maldeghem ISSN 0925-9899 (print) • ISSN 1572-9192 (electronic)
	Home > Vol 31, No 2 (2010) An algorithmic Littlewood-Richardson rule Ricky Ini Liu DOI: 10.1007/s10801-009-0184-1 Abstract We introduce a Littlewood-Richardson rule based on an algorithmic deformation of skew Young diagrams and present a bijection with the classical rule. The result is a direct combinatorial interpretation and proof of the geometric rule presented by Coskun ( 2000). We also present a corollary regarding the Specht modules of the intermediate diagrams. Pages: 253–266 Keywords: keywords Littlewood-Richardson rule; Specht modules; Grassmannian Full Text: PDF References 1. Coskun, I.: A Littlewood-Richardson rule for two-step flag varieties. Invent. Math. 176(2), 325-395 (2009) 2. James, G.D.: A characteristic-free approach to the representation theory of Sn. J. Algebra 46(2), 430- 450 (1977) 3. Knutson, A., Tao, T.: Puzzles and (equivariant) cohomology of Grassmannians. Duke Math. J. 119(2), 221-260 (2003) 4. Peel, M.H., James, G.D.: Specht series for skew representations of symmetric groups. J. Algebra 56(2), 343-364 (1979) 5. Reiner, V., Shimozono, M.: Percentage-avoiding, northwest shapes and peelable tableaux. J. Combin. Theory Ser. A 82(1), 1-73 (1998) 6. Sagan, B.E.: The Symmetric Group: Representations, Combinatorial Algorithms, and Symmetric Functions, 2nd edn. Graduate Texts in Mathematics, vol. 203. Springer, New York (2001) 7. Stanley, R.P.: Enumerative Combinatorics, vol. 2. Cambridge Studies in Advanced Mathematics, vol. 62. Cambridge University Press, Cambridge (1999). With a foreword by Gian-Carlo Rota and © 1992–2009 Journal of Algebraic Combinatorics © 2012 FIZ Karlsruhe / Zentralblatt MATH for the EMIS Electronic Edition

JOURNAL OF ALGEBRAIC COMBINATORICS

An algorithmic Littlewood-Richardson rule

Abstract

References

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